2/16/17

We published a book and a few papers [e.g., 1, 2, 3] on
economic growth. There are numerous plots demonstrating the decelerating rate
of real economic growth in developed countries. The long-term component of real
GDP increase is very simple – annual increment in real GDP per capita, rGDPpc, is
a constant, which does not change with time since the late 1940s. This makes
the rate of growth to be inversely proportional to the current level of rGDPpc:
dln(rGDPpc(t)) = A/rGDPpc(t). The
population component is large in the USA – approximately 1% per year since the 1950s,
but negative in Japan. Therefore, we use rGDPpc instead of rGDP, which is rather
misleading.

In the first paper published in 2005, we used data
between 1950 and 2003 and found that the rGDPpc annual increment has a positive
slope. It was considered as an indication of future problems between 2004 and
2016, which was actually observed as the Great Recession and further sluggish recovery.
Figure 1 displays the original time series between 1947 and 2003 (black
circles) extended by the estimated made since 2004. Instead of time, we use
rGDPpc as argument. For recession periods, when the rGDPpc falls, one observes
loops in the curve. Our prediction was right – the slope of the regression line
has dropped from 0.02 (black linear trend line) to 0.007 (red trend line). The
average increment in rGDPpc was $551 as measured in 2009US$.

Figure 1. Annual increment in real GDP per capita in
the USA since 1947. Black circles show the period between 1947 and 2003, and
red circles show the period extended into 2016. Linear trends are shown in
black and red, respectively. Two regression equations demonstrate the change in
slope since 2003.

There is another problem with the original rGDPpc time
series borrowed from the BEA web site. It is calculated as a ratio of rGDP and
total population, while only economically active population matters. Therefore,
we have to correct the original rGDPpc
for the ratio shown in Figure 2. When the rGDPpc multiplied by the population correction
factor, one obtains a better view on the long-term growth rate, as depicted in
Figure 3. The trend in the rGDPpc annual increment is absent. This observation
means that the rate of real GDP growth in the USA (and other developed countries)
is decaying inversely proportional to rGDPpc. Leading economic countries will
be growing at a rate of about 1.5% per year in the next 20 years. In 2016, the
rate of rGDPpc growth was 0.9% per year. This mediocre growth will be accompanied by decreasing rate of population growth as observed since the earlier 2000s.

Figure 2. The ratio of total population and working
age population (16 and above). The rGDPpc is corrected (multiplied) by this ratio.

Figure 3. Same as in Figure 1, but for the population corrected
rGDPpc.

1/22/17

Some commentators say that Trump puts an end of global order. Not getting into details of a number of wars, global terrorism and tension between West and East, I would guess that the " global order" was not about peace and dignity but just an opinion of a few people, who ignored, as we know now, views of various majorities. Trump is not their candidate because he directly expresses what the majority dreams. The division of nations, alliances, and the whole world roots in ignoring and ignorance. Trump gives us a hope that the world can regain the overall balance, where all people and countries have individuality and voices (people are not deplorable). Thanks, American people.

I would propose to nominate Trump for the Nobel Peace Prize. Stability may come back, but the dark forces are still dangerous and aggressive.

1/21/17

I have no doubt that real economic growth in the USA does not depend on presidential opinion and action. On average, the US will be growing at a rate of about 2% in the long run. In 2017, a recession is possible, but it has no connection to Trump.

What Trump can change then? This is the question from both sides of the split nation. The complete answer is difficult to present in a post. I'll try to formulate some predictions, which are most relevant to my study.

1. Oil price depends on global processes and hardly to be corrected by Trump's energy policy. Hydrofracturing might become a cheaper technology because of lower expenses for environment protection.

2. Most of commodities (iron, non-ferrous metals, grain, etc.) are low now and will likely grow in the near future. It is good time to renew the US production capabilities. His plan to return production to the US is wise.

3. Competition with China is getting hot. China is a bigger US factory with cheap labor. All profit of cheaper labor is privatized by the top 1% of the US population. China cannot resist because its economy is not able to grow without the US market and investment.

4. The richest 1% is a big threat to Trump, however. Some of them are inside his administration. Bees against honey. Such conflicts are always resolved in favor of money, as Marx said.

5. Inflation will be low with low volatility. US administration does not affect prices.

6. Stock market will fall in 2017.

7. Labor force participation will be falling and the labor force participation will not be growing fast.

1/15/17

In 2010, we published a paper in the Journal of Applied Economic Sciences, which predicted real GDP per capita, rGDPpc, in several developed countries. Corresponding working paper was published in 2009 and covered the period before 2007. The evolution of rGDPpc in New Zealand was also presented in this blog in 2011.
Here, we revisit the 2010 model for New Zealand. It is important to stress that all defining parameters, which were estimated by the LSQ method from the data before 2008, are retained in the revisited model. Therefore, this is an out-of-sample test. The test result shows that our model accurately predicts the evolution of real GRP in New Zealand at an 8-year horizon. As predicted in 2009, in the next few years the growth rate will be increasing, except a deep fall in 2017, as we also expect in the USA. Since the full prediction horizon is 14 years, we will be reporting on the model prediction in the future, but not often – the change in real economic growth is a slow process.
The original macroeconomic model for real GDP growth in developed countries was formulated in 2006 in the paper “GDP growth rate and population” published in the ECINEQ WPS. The model links the rate of growth in rGDPpc, g(t) = dln(rGDPpc)/dt, with the attained level of the rGDPpc and the rate of growth in population of a coutry-specific age.

g(t) = dln rGDPp(t)/dt = A/rGDPpc(t) + 0.5dlnNs(t)/dt (1)

where empirical constant A and the specific age, Ns, are estimated from data. To obtain the model parameters, we used rGDPpc time series borrowed from the Total Economy Database. The best fit annual increment value is A=$420 (notice that we used the EKS US$, as published by the Conference Board in 2016, while the GK 1990US$ were used before). The term A/rGDPpc(t) corresponds to inertial economic growth, which is observed when there is no change in the Ns. The specific age population in New Zealand is 14 years, as in the previous versions. To describe the change in Ns, we used the age pyramid obtained in the 2006 census and extrapolated it in the past and in the future. The precision of Ns predictions decreases with the difference between the predicted year and 2006. We do not use fresher censuses because the goal of this study is to prove the model and to assess the accuracy of prediction at various time horizons. The largest time horizon for the 2006 census is 2021.
Figure 1 presents the observed and predicted GDP growth rates for New Zealand as obtained in 2008. Both curves are characterized by high-amplitude oscillations likely associated with measurement errors. Therefore, in Figure 2 we present both annual curves smoothed with MA(5) and MA(3), respectively. One can conclude that our prediction from 2008 was correct and real GDP per capita in New Zealand follows the predicted curve. This is the best validation of our model for NZ and the driving force of real economic growth in developed countries.

Figure 1. Observed and predicted growth rate of real GDP per capita in New Zealand between 1980 and 2015.

Figure 2. The observed curve in Figure 1 is smoothed with a five-year moving average. The predicted rate is smoothed with MA(3). One can observe an outstanding accuracy of GDP prediction for 2009 and 2015 (between the smoothed curves).

1/14/17

In this blog, we introduced several models predicting inflation and unemployment in Germany in 2009 and 2010. These two posts presented a shorter version of our extended paper published in 2007 on the dependence of the CPI, GDP deflator (DGDP) and rate of unemployment, UE, on the change in labor force, LF. Two sources provide a complete description of our model and we are not going to repeat it in detail. Overall, the model says that one can describe inflation as a liner lagged function of the rate of labor force change, dLF/LF, and the rate of unemployment
DGDP(t) = adLF(t-6)/LF(t-6) + bUE(t-1) + c
where a, b, and c are empirical coefficients, t-6 means that dLF/LF leads inflation by 6 years, and t-1 means that UE leads DGDP by 1 year. Therefore, we have a one-year ahead natural prediction horizon. When we add new data, the empirical coefficients can change because the LSQ estimation procedure. But they should not change much.
Here, we revisit the DGDP prediction given 10 years ago using OECD data now available for the period between 2006 and 2016. Figure 1 compares the predicted and observed time series. Coefficients are as follows: a=0.3, b=-0.61, c=0.062, which are very close to the initial estimates in 2007. Overall, the observed curve is well matched by the predicted one, but the former has much larger variations. They disappear after smoothing with a four-year moving average, as shown in Figure 2. The fit is exciting. In Figure 3, we present the modelling error as the difference between the observed and predicted time series. This is an I(0) process, which is an important issue is the DGDP is a nonstationary process.
Conclusion: the GDP price deflator in Germany will be growing in the next years, despite the CPI inflation is close to zero. In 2016, DGDP was approximately 2%.

Figure 1. Predicted and measured DGDP in Germany

Figure 2. The observed time series is smoothed with 4-year moving average.

1/13/17

In
2013, we published a paper “Does Banque de France control inflation and unemployment?”We
demonstrated that the French economy would likely sink into a longer period of
deflation or very low inflation rate after 2013. This is an excerpt from the paper discussing how
Banque de France could boost labour force growth and inflation by flooding the
French economy with money. Instead of this simple measure, there were several
depressing years of contingency measures introduced by the ECB. This update uses
data for the past three years and proves that austerity is a counterproductive approach.
We just extend inflation prediction by 3 years ahead (to 2019) and put new
measurement without change in the previous estimates. We have nothing to add. The
text is still valid.

“Here, we
consider the rate of inflation, unemployment, and the change in labour force
altogether. For France, the generalized relationship is obtained as a sum of
(10) and (13), which results, with some marginal tuning of all coefficients in
order to reduce the standard error of the model, in the following equation for
the GDP deflator:

π(t) = 2.69l(t-5) - u(t-5) + 0.108; 1971≤t≤1995

π(t) = 6.40l(t-5)
- u(t-5) + 0.059; t≥1996 (14)

For the OECD CPI:

π(t) = 3.0l(t-5) - u(t-5) + 0.108; 1971≤t≤1995

π(t) = 5.0l(t-5)
- u(t-5) + 0.067; t≥1996 (15)

where we model inflation since
it lags by 5 years behind the change in labour force and unemployment.
Formally, one can re-write both relationships for u(t). Notice that the change
in the slopes and intercepts are much smaller than in individual relationships.
The structural break is less prominent and thus its estimate is less
reliable.

The annual and
cumulative curves for both cases are presented in Figure 12. Linear regression of the observed inflation
against that predicted according to (14) and (15) is characterized by
outstanding for annual curves statistical properties: R2=0.87 and RMSFE=0.015
y-1,andR2=0.83 and RMSFE=0.017 y-1,
respectively. For the cumulative curves, both R2 are larger than 0.99
and RMSFE~0.025 y-1, i.e. by 20% smaller than the naive ones (see
Table 4). These estimates were obtained for the period between 1972 and 2012 with
a five-year lag. These RMSFEs are the best obtained for France at a five year
horizon so far. They explain the rate of price inflation to the extent beyond
which measurement uncertainty should play the key role. Practically, there is
no room for any further improvements in R2 given the accuracy of the
current prediction.

Conclusion

We have successfully modelled
unemployment and inflation in France. Their sensitivity to the change in labour
force requires very accurate measurements for any quantitative modelling to be
reliable. Unfortunately, the OECD labour force time series does not meet this
requirement and poor statistical results are obtained for annual readings. The
best prediction is obtained with the moving average technique applied to the
change in labour force. For the period between 1970 and 2012, linear regression
analysis provides R2 as high as 0.8 to 0.9 for the rate of
unemployment and GDP deflator. The RMSFE for the best CPI model is 0.015 y-1
and 0.010 y-1 for the GDP deflator, both at a four year horizon. For
the period after 1994, the best RMSFE=0.005 y-1 for both measures of
inflation. In 1994, our models have structural breaks found by the OLS fit. For
the VECM representation, the standard error for the GDP deflator is as low as 0.010
y-1 at a four year horizon and 0.005 y-1 for a two year
horizon. The whole period and 0.004 y-1 for the period after 1994. All
in all, we have obtained a very accurate description of unemployment and
inflation in France during the past 40 years.

Having discussed
the technically solvable problems associated with the uncertainty in the labour
force measurements, we start tackling the problem associated with the
divergence of the observed and predicted curves starting around 1995. An understanding of this discrepancy is a
challenge for our concept. Potentially, these curves diverge due to the new
monetary policy introduced by the Banque de France. We may claim that the
policy of constrained money supply, if applied, could artificially disturb
relationships (9), (10), and (13). We had to introduce a structural break and
to estimate new coefficients after 1995 for unemployment and after 1994 for
inflation, respectively. These coefficients are less reliable because the relevant
time series are short and vary in narrow dynamic ranges, but they are
definitely different from those before the breaks. One could conclude that
Banque de France has created some new links between the unemployment,
inflation, and labour force, shifting coefficients in the original long term
equilibrium relations.

Figure 12. Comparison of the
observed and predicted inflation in France - annual and cumulative inflation
since 1972. The predicted inflation is a linear function of the labour force
change and unemployment.

We think that the true money supply in excess of that
related to real GDP growth should be completely controlled by the demand
related to the growing labour force. This excessive money supply is
accommodated in developed economies through employment growth, which then
causes price inflation. The latter serves as a mechanism effectively returning
the normalized personal income distribution to its original shape (Kitov and Kitov,
2013). The relative amount of money that the economy needs to accommodate
through increasing employment, as a reaction on independently growing labour
force, is constant through time but varies among developed countries. This
amount has to be supplied to the economy by central bank.

The ESCB limits
money supply to achieve price stability. For France, the growth in labour force
was so intensive after 1995 that it requires a much larger money supply for
creation of an appropriate number of new jobs. The 2% artificial constraint on
inflation, and thus on the money supply, disturbs relationships (10) and (13).
Due to lack of money in the French economy, the actual (and mainly exogenous)
growth in labour force was only partially accommodated by 2% inflation. The lack
of inflation resulted in increasing employment. In other words, instead of 2%
unemployment, as one should expect according to the relationship before 1995,
France had 9% unemployment. Those people who entered the labour force in France
in excess of that allowed by the target inflation rate had no choice except to
join unemployment in order to compensate the natural 7% rate of inflation,
which was suppressed to 2%.

The lags and
amplification factors (sensitivities) found for unemployment and inflation in France
are quite different from those obtained for the USA and Austria (Kitov and Kitov,
2010). The latter country is
characterized by the absence of time lags and low sensitivities. In the USA,
inflation lags by two and unemployment by five years behind the change in
labour force, with sensitivities much lower than those in France. Apparently,
the variety of lags is the source of problems for the Phillips curve concept.

The causal link
between inflation, unemployment, and labour force gives a unique opportunity to
foresee future at extra long time horizons. The accuracy of such long-term
unemployment and inflation forecasts is proportional to the accuracy of labour
force projections. For example, central banks can use labour force projections
as a proxy to “inflation expectation” in their NKPCs. Figures 8 and 12 imply
that France will be enjoying a period of low inflation rate in the near future.
Monetary policy of the ECB is also an important factor for these forecasts
because of its influence on the partition of the labour force growth between
inflation and unemployment. Moreover, this is the responsibility of the ECB and
Banque de France to decide on the partition. “

Six years ago we wrote a paper on price
inflation and unemployment in Australia. Here, we compare our predictions
against measurements. Concluding this paper we made a projection into 2050:

“As a final
remark on the evolution inflation (DGDP) and unemployment in Australia we
present two predictions as based on the labour force projection provided by the
Productivity Commission (2005) and the coefficients in (7) and (8) estimated
for the period after 1994: a1=3.299, a2=-0.0259; b1=-2.08,
b2=0.0979. We assume that there will be no change in the definitions
of all involved macroeconomic variables through 2050 and these coefficients
will hold. Unfortunately, the accuracy
of labour force projection has a poor historical record, taking into account
the projection between 1999 and 2016. Nevertheless, it may be useful for
assessment of the long-term evolution.
Figure 15 displays both predictions, with the period before 2010
represented by actual labour force measurements since the projected ones were
not accurate.

The level of price inflation after
2015 will likely fall below zero and will remain at -1.5% per year through
2050. This lengthy period of deflation will be accompanied by an elevated rate
of unemployment approaching 9% around 2030. The evolution of both variables is
not fortunate for the Australian economy and is chiefly associated with the
population ageing. The latter suppresses demographic growth and reduces the
rate of participation in labour force. Australia will likely need a larger
international migration to overcome deflation and high unemployment. This is
the means to overcome deflation the U.S. has been using for many years, but
even with a large positive migration the Australian economy will be on the
brink of deflation during the next four decades. Without migration, Australia
will soon join Japan having the same demographic problems and price deflation
since the late 1990s.”

Here, we
update our projections with three new readings for 2010 through 2016. As we predicted,
the Australian economy is in the beginning of a long deflation period with an
elevated unemployment. The reason behind these processes is the same as in Japan – falling labor force.

Figure. Same as in the above figure borrowed from our
paper, but with updated measurements for
the period between 2010 and 2016.

1/11/17

Here, I continue
presenting cases of accurate predictions based on the link between real GDP and
unemployment, which is a modified Okun’s law in an integral form. This is a four-year
update for Canada. The model prediction is getting better and better!

Canada provides an excellent
set of macroeconomic data, which can be described by a few deterministic links
with a high level of reliability and confidence. We have retrieved real GDP (GK
per capita) data from the Total Economic Database and the rate of
unemployment from the OECD. In 2012, we
published a paper in the Journal of Theoretical and Practical Research in
Economic Fields, where presented the first version of the modified Okun’s law for
developed countries including Canada. The model was estimated till 2010 and
used the data available in 2011.

The original model
for Canada was also presented in this blog in 2011. It’s time to revisit
the model and its predictions. It has to be mentioned that all coefficients below
were estimated 6 years ago and we do not change them. Overall, the model is
estimated using the LSQ technique to the integral version of Okun’s law:

u(t) = u(t0) + bln[G/G0] + a(t-t0) (1)

where u(t) is the predicted rate of
unemployment at time t, G is the level of real GDP per capita, a and b are empirical coefficients. For Canada, we estimated the model
with a structural break allowed by data somewhere between 1980 and 1990. The
best-fit (dynamic) model minimizing the RMS error of the cumulative model (1)
is as follows:

This model suggests no shift in the slope and a bigger change in the intercept
around 1983. Figure 1 depicts the observed and predicted curves of the unemployment
rate. Considering the accuracy of measurements for both involved variable the
fit is excellent. The integral form of the dynamic Okun’s law (1) is
characterized by a standard error of 0.66% for the period between 1971 and 2016.
The average rate of unemployment for the same period is 8.12% with a standard
deviation of the annual increment of 0.92%. Figure 2 shows that when the observed time
series is regressed against the predicted one, R2=0.87.

One can suggest that the rate of unemployment has been driven by real economic
growth and there is no much room for other macroeconomic variable to intervene.
Currently, Canada need approximately 1% per year increase in GDP per capita in
order unemployment to fall. Otherwise, it will be growing as it was in 2015 and
2016. With decaying economic growth, as described in this
post, the rate of unemployment will be growing in Canada.

Figure 1. The observed and predicted rate of unemployment in the Canada between
1970 and 2016.

Figure 2. The measured time series is regressed against the predicted one. R2=0.87
with both time series likely to be stationary.

Three and a half years ago, I reported that Australia gives the best example of accurate
quantitative prediction of unemployment in developed countries and therefore I felt satisfaction. Historically, we published a
paper on Okun's in developed countries in the Journal of Theoretical and
Practical Research in Economic Fields in 2012. We presented the
first version of the modified Okun’s law for developed countries including Australia.
The model was estimated before 2010 and we used only data available in 2011. Briefly,
the model is estimated by the LSQ technique applied to the integral version of
Okun’s law:

u(t) = u(t0)
+ bln[G/G0] + a(t-t0)
(1)

where u(t) is the predicted
rate of unemployment at time t, G is the level of real GDP per capita, a and b are empirical coefficients. Essentially, our model says that the current level of unemployment is the integral effect of the historical growth in GDP per capita. Then the change in unemployment, du, is proportional to the growth rate in GDP per capita, whcih can be expressed as dlnG. This is the differential (dynamic) form of the Okun's law.

For Australia, we estimated an integral model
with one structural break allowed by data somewhere between 1980 and 2000. The
best-fit (dynamic) model minimizing the RMS error of the cumulative model (1) with
the new data revision is as follows:

du =
-0.69dlnG + 1.50, t before 1991

du =
-0.45dlnG + 0.75, t after 1991 (2)

This is an update with new data for the years between 2012 and
2016 obtained from: real GDP (GK per capita) from the Total
Economic Database, and the rate of unemployment from the
OECD.

Figure 1 depicts the observed and predicted curves of the
unemployment rate. Statistically, the agreement is better than three years ago,
when it was excellent. Figure 2 shows that when the observed time series is
regressed against the predicted one, R2=0.88 (0.86 in 2013 and 0.84
in 2011). The integral form of the
dynamic Okun’s law (1) is characterized by a standard error of 0.7% for the
period between 1975 and 2016. The average rate of unemployment for the same
period is 7.0% with a standard deviation of the annual increment of 1.4%. This is an extremely accurate prediction
considering the accuracy of GDP (~1% per year) and unemployment (0.3% to 0.4%)
estimates. The whole discrepancy is related to the measurement errors and thus
the residual error shown in Figure 3 is an I(0) random process.

The rate of unemployment depends on the cumulative change in real
GDP per capita, as relationship (1) implies. To reduce the rate of unemployment
in Australia, the rate of GDP (real per capita) growth must be above 1.7% per
year.

I have to repeat it again and again. The beauty of science is the accuracy of
prediction. It is difficult to express the feelings of a researcher than new observations
fit his predictions based on a simple concept. It is especially exiting when this concept is
different from the mainstream one.

Figure 1. The observed and predicted rate of unemployment in
Australia between 1975 and 2015. The regression line is red.

Figure 2. The measured time series is regressed against the
predicted one. R2=0.88 with both time series likely to be stationary.

1/10/17

In this blog, three and a half years ago we revisited our prediction of the rate of unemployment in Italy, which had been made in our
2008 paper. Five years after
this publication, we found that the accuracy of prediction was excellent. We
decided that our model works well. Since the model has a natural 11-year horizon, in this post we check our original (2008!)
prediction for 2013 and 2016 (preliminary) using new estimates. According to the OECD, the unemployment rate
in 2015 is 12.0%. For 2016, the rate is 11.6%. There is no doubt; these values again fully validate
our model of unemployment as a function of the change in labour force. Moreover,
our model has predicted two pivot points in the unemployment rate – in 2008 and
2014. There was a peak observed in 2014 and currently the rate of unemployment
is falling.

We introduced the model of unemployment in Italy in 2008
with data available only for 2006. The rate of unemployment was near its bottom
at the level of 6%. The model predicted a long-term growth in the rate
unemployment to the level of 11% in 2013-2014.

The overall agreement between the measured and predicted
unemployment estimates in Italy validates our concept, which states that there
exists a long-term equilibrium link between unemployment, ut, and the rate of change of labour force, lt=dLF/LFdt. Italy is a unique
economy to validate this link because the time lag of unemployment behind lt is eleven (!) years.

The
estimation method is standard – we seek for the best overall fit between
observed and predicted curves by the LSQR method. All in all, the best-fit equation
is as follows:

ut = 5.0lt-11 + 0.07 (1)

As mentioned above, the
lead of lt is eleven
years. This defines the rate of unemployment many years ahead of the current
change in labour force.

Figure 1 presents the observed
unemployment curve and that predicted using the rate of labour force change 11
years ago and equation (1). Since the estimates of labour force in Italy are
very noisy we have smoothed the annual predicted curve with MA(5). All in all,
the predictive power of the model is excellent and timely fits major peaks and
troughs after 1988. The period between 2006 and 2016 was predicted almost
exactly. (If anybody knows a better prediction in 2008 of the 2016 unemployment
rate, please give us the link.)

The fit between predictions
and observations is the best validation of any quantitative model. No other
macroeconomic model is capable to describe such dramatic turns many years ahead.
The evolution of the rate of unemployment in Italy is completely defined ten
year ahead. Since the linear coefficient
in (1) is positive one needs to reduce the growth in labour force in order to
reduce unemployment in the second half of the 2020s. For the 2010s everything
is predefined already and the rate of unemployment will be high, i.e. above 9%.

AbstractWe apply cross correlation between multichannel seismic waveforms as a technique for signal detection and automatic event building at the International Data Centre (IDC). This technique allows detecting signals with amplitudes by at least a factor of two lower than those found in the current version of IDC processing. Previously, we processed with a cross correlation detector aftershock sequences of a large earthquake with thousands of aftershocks detected by the International Monitoring System (IMS) and a middle-size earthquake (hundreds of aftershocks). Our study has revealed that the official Reviewed Event Bulletin (REB) of the IDC misses from 50% to 70% valid seismic events. Since the IDC is a major contributor to the International Seismological Centre (ISC) these extra events together with the associated arrivals are missing from the ISC bulletin which is an open data source for the broader seismological and geophysical community.Here, we assess the ultimate resolution of the cross correlation technique with specific IDC constraints. The aftershock sequence of the October 5, 2011 mb(IDC)4.2 earthquake in the North Atlantic is an example of a weak sequence and includes only 38 REB events. The number and quality of these REB events, which are used as master events, allow conducting a comprehensive interactive review by experienced analysts of all event hypotheses obtained by the cross correlation technique. In an iterative procedure starting from the main shock, all 38 REB events were found and analysts added 26 REB events. Therefore, the cross correlation pipeline reduces the detection threshold by a factor of 2 to 3 and approximately doubles the number of events in the REB, and thus, in the ISC bulletin for the North Atlantic.

1/2/17

Approximately 10 years ago we presented our macroeconomic model explaining the evolution of real GDP per capita in the USA [1, 2, 3] and other developed countries [4]. This model was formally tested by econometric tools for cointegration [5]. Standard tests have proven that the underlying concept is valid.

Our model does explain the past measurements of real GDP as driven by the only population related variable – the influx of fresh blood - young people. Variations in the rate of growth for a given economy is fully defined by the change in the number of youngsters entering this economy with all their input to the future, including future credits. Some of major results were presented in this blog (e.g., here and here).

The power of our model is not in explanation of the past, but in prediction of the future. We can predict at a 9-year horizon for the USA using population measurements and at a longer horizon with population projections. In this blog, we have not been reporting on this model since 2011, however, because of no changes predicted after the 2009 recession. Today, we present a forecast of a dramatic fall in real GDP per capita in 2017. Figure 1 compares the measured rate of growth in real GDP per capita (dGDPpc/GDPpc), as obtained from the BEA’s quarterly tables, and that predicted by the change rate of the number of 9-year-olds, dN9/N9, as projected by the Census Bureau. Since the 2009 recession is well explained (actually predicted) by the same data we consider the probability of the 2017 recession as very high. In essence, it might be even deeper than in 2009.

Figure 1. The measured change in the number of 9-year-olds, dN9/N9, and that predicted from the change in real GDP per capita (0.5dGDPpc/GDPpc).

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